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��YZeje�eje�dS(s~Abstract Base Classes (ABCs) for numbers, according to PEP 3141.

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��Zed��Zed��Zed��Zed��Zed��Zed��Zed��Zed��Zd�ZRS(saComplex defines the operations that work on the builtin complex type.

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t�dS(sXRetrieve the real component of this number.

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t�dS(sself * otherN(R(RR((s,/opt/alt/python27/lib64/python2.7/numbers.pyt__mul__dscC s
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t�dS(s)self // other: The floor() of self/other.N(R(RR((s,/opt/alt/python27/lib64/python2.7/numbers.pyt__floordiv__�scC s
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        < on Reals defines a total ordering, except perhaps for NaN.N(R(RR((s,/opt/alt/python27/lib64/python2.7/numbers.pyt__lt__�scC s
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self <= otherN(R(RR((s,/opt/alt/python27/lib64/python2.7/numbers.pyt__le__�scC stt|��S(s(complex(self) == complex(float(self), 0)(tcomplextfloat(R((s,/opt/alt/python27/lib64/python2.7/numbers.pyR�scC s|
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long(self)N(R(R((s,/opt/alt/python27/lib64/python2.7/numbers.pyt__long__,scC s
t|�S(s6Called whenever an index is needed, such as in slicing(tlong(R((s,/opt/alt/python27/lib64/python2.7/numbers.pyt	__index__1scC s
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S(s"Integers are their own numerators.((R((s,/opt/alt/python27/lib64/python2.7/numbers.pyR9|scC sdS(s!Integers have a denominator of 1.i((R((s,/opt/alt/python27/lib64/python2.7/numbers.pyR:�s(N(R	R
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